[" 24.The major axis and minor axis of an ellipse "],[" are respectively "x-2y-5=0" and "],[2x+y+10=0" ,one end of latusrectum is "],[(3,4)," then the foci are "]

The major axis and minor axis of an ellipse are, respectively, x-2y-5=0 and 2x+y+10=0 . If the end of the latus rectum is (3,4) find focii

The major axis and minor axis of an ellipse are, respectively, x-2y-5=0 and 2x+y+10=0 . If the end of the latus rectum is (3,4) find focii

The major and minor axis of the ellipse 400x^(2)+100y^(2)=40000 respectively are

The major and minor axes of an ellipse are along the X -axis and Y -axis respectively. If its latusrectum is of length 4 and the distance between the foci is 4sqrt(2) , then the equation of that ellipse is

The major and minor axes of an ellipse are along x,y axis respectively. If its latusrectum is of length 4 and the distance between the foci is 4sqrt(2) then the equation of that ellipse

The lengths of major and minor axis of an ellipse are 10 and 8 respectively and its major axis is along the Y-axis. The equation of the ellipse referred to its centre as origin is

The lengths of major and minor axis of an ellipse are 10 and 8 respectively and its major axis is along the Y-axis. The equation of the ellipse referred to its centre as origin is

Taking major and minor axes as x and y-axes respectively , find the eqation of the ellipse Whose eccentricity is (3)/(5) and coordinates of foci are (pm 3, 0 )

Taking major and minor axes as x and y -axes respectively, find the equation of the ellipse whose lengths of minor axis and latus rectum are 4 and 2 .

Find the foci, vertices, length of major axis and minor axis of the ellipse. 6x^(2)+9y^(2)+12x-36y-12=0